A note on Dehn colorings and invariant factors

Abstract

If A is an abelian group and φ is an integer, let A(φ) be the subgroup of A consisting of elements a ∈ A such that φ · a=0. We prove that if D is a diagram of a classical link L and 0=φ0,φ1,…,φn-1 are the invariant factors of an adjusted Goeritz matrix of D, then the group DA(D) of Dehn colorings of D with values in A is isomorphic to the direct product of A and A=A(φ0),A(φ1),…,A(φn-1). It follows that the Dehn coloring groups of L are isomorphic to those of a connected sum of torus links T(2,φ1) \# ·s \# T(2,φn-1).